On slopes of L-functions of Zp-covers over the projective line

Abstract

Let P: ·s → C2→ C1→ P1 be a Zp-cover of the projective line over a finite field of cardinality q and characteristic p which ramifies at exactly one rational point, and is unramified at other points. In this paper, we study the q-adic valuations of the reciprocal roots in Cp of L-functions associated to characters of the Galois group of P. We show that for all covers P such that the genus of Cn is a quadratic polynomial in pn for n large, the valuations of these reciprocal roots are uniformly distributed in the interval [0,1]. Furthermore, we show that for a large class of such covers P, the valuations of the reciprocal roots in fact form a finite union of arithmetic progressions.